Metric rigidity of kähler manifolds with lower ricci bounds and almost maximal volume

Ved Datar; Harish Seshadri; Jian Song

doi:10.1090/proc/15473

Metric rigidity of kähler manifolds with lower ricci bounds and almost maximal volume

Ved Datar, Harish Seshadri, Jian Song

Research output: Contribution to journal › Article › peer-review

Abstract

In this short note we prove that a Kähler manifold with lower Ricci curvature bound and almost maximal volume is Gromov-Hausdorff close to the projective space with the Fubini-Study metric. This is done by combining the recent results on holomorphic rigidity of such Kähler manifolds (see Gang Liu [Asian J. Math. 18 (2014), 69–99]) with the structure theorem of Tian-Wang (see Gang Tian and Bing Wang [J. Amer. Math. Soc 28 (2015), 1169–1209]) for almost Einstein manifolds. This can be regarded as the complex analog of the result on Colding on the shape of Riemannian manifolds with almost maximal volume.

Original language	English (US)
Pages (from-to)	3569-3574
Number of pages	6
Journal	Proceedings of the American Mathematical Society
Volume	149
Issue number	8
DOIs	https://doi.org/10.1090/proc/15473
State	Published - 2021
Externally published	Yes

All Science Journal Classification (ASJC) codes

Mathematics(all)
Applied Mathematics

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title = "Metric rigidity of k{\"a}hler manifolds with lower ricci bounds and almost maximal volume",

abstract = "In this short note we prove that a K{\"a}hler manifold with lower Ricci curvature bound and almost maximal volume is Gromov-Hausdorff close to the projective space with the Fubini-Study metric. This is done by combining the recent results on holomorphic rigidity of such K{\"a}hler manifolds (see Gang Liu [Asian J. Math. 18 (2014), 69–99]) with the structure theorem of Tian-Wang (see Gang Tian and Bing Wang [J. Amer. Math. Soc 28 (2015), 1169–1209]) for almost Einstein manifolds. This can be regarded as the complex analog of the result on Colding on the shape of Riemannian manifolds with almost maximal volume.",

author = "Ved Datar and Harish Seshadri and Jian Song",

note = "Funding Information: Received by the editors October 30, 2020. 2020 Mathematics Subject Classification. Primary 53C24, 53C55. Research supported in part by National Science Foundation grant DMS-1711439, UGC (Govt. of India) grant no. F.510/25/CAS-II/2018(SAP-I), and the Infosys Young investigator award. Publisher Copyright: {\textcopyright} 2021 American Mathematical Society",

year = "2021",

doi = "10.1090/proc/15473",

language = "English (US)",

volume = "149",

pages = "3569--3574",

journal = "Proceedings of the American Mathematical Society",

issn = "0002-9939",

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T1 - Metric rigidity of kähler manifolds with lower ricci bounds and almost maximal volume

AU - Datar, Ved

AU - Seshadri, Harish

AU - Song, Jian

N1 - Funding Information: Received by the editors October 30, 2020. 2020 Mathematics Subject Classification. Primary 53C24, 53C55. Research supported in part by National Science Foundation grant DMS-1711439, UGC (Govt. of India) grant no. F.510/25/CAS-II/2018(SAP-I), and the Infosys Young investigator award. Publisher Copyright: © 2021 American Mathematical Society

PY - 2021

Y1 - 2021

N2 - In this short note we prove that a Kähler manifold with lower Ricci curvature bound and almost maximal volume is Gromov-Hausdorff close to the projective space with the Fubini-Study metric. This is done by combining the recent results on holomorphic rigidity of such Kähler manifolds (see Gang Liu [Asian J. Math. 18 (2014), 69–99]) with the structure theorem of Tian-Wang (see Gang Tian and Bing Wang [J. Amer. Math. Soc 28 (2015), 1169–1209]) for almost Einstein manifolds. This can be regarded as the complex analog of the result on Colding on the shape of Riemannian manifolds with almost maximal volume.

AB - In this short note we prove that a Kähler manifold with lower Ricci curvature bound and almost maximal volume is Gromov-Hausdorff close to the projective space with the Fubini-Study metric. This is done by combining the recent results on holomorphic rigidity of such Kähler manifolds (see Gang Liu [Asian J. Math. 18 (2014), 69–99]) with the structure theorem of Tian-Wang (see Gang Tian and Bing Wang [J. Amer. Math. Soc 28 (2015), 1169–1209]) for almost Einstein manifolds. This can be regarded as the complex analog of the result on Colding on the shape of Riemannian manifolds with almost maximal volume.

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JF - Proceedings of the American Mathematical Society

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Metric rigidity of kähler manifolds with lower ricci bounds and almost maximal volume

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